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Idea

An $n$ -fold iterated loop space $\Omega^n X$ canonically carries the structure of an $E_n$ -algebra (an algebra over the little n-disk operad $\mathcal{C}_n$ ) with $Sym(k)$ -equivariant structure maps

\mathcal{C}_n(k) \times_{Sym(k)} \big( \Omega^n X \big)^k \overset{\mu_k}{\longrightarrow} \Omega^n X \,.

Passing to ordinary homology of the loop space with coefficients in a finite field, $H_\bullet\big( \Omega^n X; \mathbb{F}_p \big)$ , the Dyer-Lashof operations are essentially the pushforward/images in homology under the binary operation $\mu_2$

H_\bullet\big( \mathcal{C}_n(2) \times_{Sym(2)} (\Omega^n X)^2 ; \mathbb{F}_p \big) \overset { (\mu_2)_\ast } {\longrightarrow} H_\bullet\big( \Omega^n X; \mathbb{F}_p \big) \mathrlap{\,.}

or rather, this map precomposed with

\begin{array}{ccc} H_i\big( \mathcal{C}_n(2)/Sym(2) ; \mathbb{F}_p \big) \times H_q\big( \Omega^n X ; \mathbb{F}_p \big) & \overset {\phantom{-} \boxtimes \phantom{-}} {\longrightarrow} & H_{i + 2 q}\big( \mathcal{C}_n(2) \times_{Sym(2)} (\Omega^n X)^2 ; \mathbb{F}_p \big) \\ (e_i, x) &\mapsto& e_i \boxtimes (x \otimes x) \mathrlap{\,.} \end{array}

Now,

\begin{aligned} \mathcal{C}_n(2) & \simeq Conf_2\big(\mathbb{R}^n\big) \\ & \simeq S^{n-1} \end{aligned}

is equivalently the configuration space of 2 points in $\mathbb{R}^n$ , which in turn is equivalently the $(n-1)$ -sphere of directions between these two points. Therefore

\mathcal{C}_n(2) \big/ Sym(2) \simeq \mathbb{R}P^{n-1}

is equivalently the real projective space.

For $p=2$ , the ordinary homology of this space is (cf. there and use the universal coefficient theorem):

H_i\big( \mathbb{R}P^{n-1}; \mathbb{F}_2 \big) \simeq \left\{ \begin{array}{ll} \mathbb{F}_2 & \;\text{for}\; 0 \leq i \leq n-1 \\ 0 & \text{otherwise.} \end{array} \right.

Therefore there is a unique homology generator $e_i$ in each degree up to $n-1$ .

Finally, the Dyer-Lashof operations $Q_i$ at the even prime are the above homology maps indexed by these generators:

\begin{array}{ccc} H_q\big( \Omega^n X ; \mathbb{F}_2 \big) &\overset{\phantom{-}Q_i\phantom{-}}{\longrightarrow}& H_{i + 2q}\big( \Omega^n X ; \mathbb{F}_2 \big) \\ x &\mapsto& (\mu_2)_\ast\big( e_i \boxtimes (x \otimes x) \big) \mathrlap{\,.} \end{array}

References

The original articles:

T. Kudo, Huzihiro Araki: Topology of cyclic loop spaces, Journal of the Institute of Polytechnics, Osaka City University, Series A, Mathematics 7 1/2 (1956) 75-102.
William Browder: Homology operations and loop spaces, Illinois J. Math. 4 3 (1960) 347–357 [http://doi:10.1215/ijm/1255456051]
Eldon Dyer, Richard Lashof: Homology of Iterated Loop Spaces, American Journal of Mathematics 84 1 (1962) 35–88 [doi:10.2307/2372804, jstor:2372804]

Further early discussion:

Goro Nishida: Cohomology operations in iterated loop spaces, Proc. Japan Acad. 44 3 (1968) 104–109 [doi:10.3792/pja/1195521291]

The modern reformulation via operads is hinted at in

Peter May; §5 in: The geometry of iterated loop spaces, Lecture Notes in Mathematics 271, Springer (1972) [doi:10.1007/BFb0067491, scan: pdf, retyped: pdf]

and expanded on in:

Frederick R. Cohen, Thomas J. Lada, J. Peter May: The Homology of Iterated Loop Spaces, Lecture Notes in Mathematics 533, Springer (1976) [doi:10.1007/BFb0080464]

Review:

Guozhen Wang: Dyer-Lashof Operations, talk slides (2018) [pdf]
Tyler Lawson: $E_n$ -ring spectra and Dyer-Lashof operations [arXiv:2002.03889]

\frac{\Gamma \vdash t:\Box A}{\Gamma \vdash \mathsf{extract}(t):A} \qquad \frac{\Gamma \vdash t : \Box A \qquad x : A \vdash u : B}{\Gamma \vdash \mathsf{let\ box}\ x = t\ \mathsf{in}\ u : B}

$\esh$

J \;=\; \sum_i f_i \theta_i + \sum_j g_j d \theta_j f_i, g_j \in C^\infty(X) \,.

Last revised on May 25, 2026 at 17:17:12. See the history of this page for a list of all contributions to it.